Symmetric edge polytopes and matching generating polynomials

Abstract

Symmetric edge polytopes AG of type A are lattice polytopes arising from the root system An and finite simple graphs G. There is a connection between AG and the Kuramoto synchronization model in physics. In particular, the normalized volume of AG plays a central role. In the present paper, we focus on a particular class of graphs. In fact, for any cactus graph G, we give a formula for the h*-polynomial of AG by using matching generating polynomials, where G is the suspension of G. This gives also a formula for the normalized volume of AG. Moreover, via the chemical graph theory, we show that for any cactus graph G, the h*-polynomial of AG is real-rooted. Finally, we extend the discussion to symmetric edge polytopes of type B, which are lattice polytopes arising from the root system Bn and finite simple graphs.